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  <a href="http://sudopedia.enjoysudoku.com/Almost_Locked_Candidates.html">Almost Locked Candidates ({5})</a>
  <p>
   Almost Locked Sets (ALS) are groups of N cells in a single house with N+1 candidates (e.g. 3 cells with 4 candidates).<br> 
   The two cell groups <b>{0}</b> and <b>{1}</b> are <a href="http://sudopedia.enjoysudoku.com/Almost_Locked_Set.html">Almost Locked Sets</a> with {6} cells and {7} candidates.
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  <p>
   All the <b>ALS candidates {2}</b> in <b>{4}</b> are either located in the <b>ALS cells {1}</b> or in the intersection of <b>{3}</b> with <b>{4}</b>.<br/>
   Therefore the ALS cells form a <a href="http://sudopedia.enjoysudoku.com/Hidden_{5}.html">Hidden {5}</a> with one of the cells in the intersection 
   which consequently must contain one of the ALS candidates <b>{2}</b>.<br/>
   It follows that this very cell also forms a <a href="http://sudopedia.enjoysudoku.com/Hidden_{5}.html">Hidden {5}</a> with the second <b>ALS cells {0}</b>. 
   All other candidates for the <b>digits {2}</b> in <b>{3}</b> can therefore be removed.
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